পদ্ধতির তুলনা করুন
নির্বাচিত পদ্ধতিগুলো পাশাপাশি পর্যালোচনা করুন; যে সারিগুলোয় পার্থক্য আছে সেগুলো চিহ্নিত করা হয়।
| স্কোর-ভিত্তিক জেনারেটিভ মডেল× | নিউরাল ওডিই (Neural ODE)× | |
|---|---|---|
| ক্ষেত্র | গভীর শিখন | গভীর শিখন |
| পরিবার | Machine learning | Machine learning |
| উদ্ভবের বছর≠ | 2019 | 2018 |
| প্রবর্তক≠ | Song, Y. & Ermon, S. | Chen, T. Q. et al. |
| ধরন≠ | Score-based generative model (SDE framework) | Continuous-depth neural network (ODE-parameterised dynamics) |
| মৌলিক উৎস≠ | Song, Y. & Ermon, S. (2019). Generative Modeling by Estimating Gradients of the Data Distribution. NeurIPS 32, 11895–11907. link ↗ | Chen, T. Q., Rubanova, Y., Bettencourt, J. & Duvenaud, D. (2018). Neural Ordinary Differential Equations. Advances in Neural Information Processing Systems (NeurIPS). link ↗ |
| অপর নাম | Skor Tabanlı Üretici Model (Score-Based / SDE), score-based diffusion, SDE-based generative model, score SDE | Nöral Diferansiyel Denklem (Neural ODE), neural ordinary differential equation, continuous-depth network, ODE-Net |
| সম্পর্কিত≠ | 5 | 4 |
| সারসংক্ষেপ≠ | A score-based generative model, introduced by Yang Song and Stefano Ermon in 2019 and generalized to the stochastic differential equation (SDE) framework in 2021, learns the gradient of the data density — the score — rather than predicting noise directly, and uses it to generate new samples. It is the mathematical generalization that unifies diffusion models under a continuous-time formulation. | A Neural ODE, introduced by Chen and colleagues in 2018, models a hidden state as the continuous solution of an ordinary differential equation whose dynamics are parameterised by a neural network. It generalises the limiting case of residual connections, making it well suited to irregularly spaced time series and physics-based modelling. |
| ScholarGateডেটাসেট ↗ |
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